The Real Powers of the Convolution of a Gamma Distribution and a Bernoulli Distribution

Abstract

In this paper, we essentially compute the set of x,y>0 such that the mapping z (1-r+r ez)x (λλ-z)y is a Laplace transform. If X and Y are two independent random variables which have respectively Bernoulli and Gamma distributions, we denote by μ the distribution of X+Y. The above problem is equivalent to finding the set of x>0 such that μx exists.